
\begin{table}[htb]
\caption{Absolute distance between societal and foreign gains and PTA support}
\begin{center}
\scalebox{0.85}{
\begin{tabular}{l c c}
\hline
 & $S-F$ (Rating) & $S-F$ (Choice) \\
\hline
Abs. distance              & $-0.07^{***}$ & $-0.02^{***}$ \\
                           & $(0.01)$      & $(0.00)$      \\
Individual gains           & $0.31^{***}$  & $0.10^{***}$  \\
                           & $(0.01)$      & $(0.00)$      \\
Societal gains             & $0.26^{***}$  & $0.08^{***}$  \\
                           & $(0.01)$      & $(0.00)$      \\
Foreign gains              & $0.13^{***}$  & $0.04^{***}$  \\
                           & $(0.01)$      & $(0.00)$      \\
Trade volume (Large)       & $0.07^{***}$  & $0.02^{***}$  \\
                           & $(0.01)$      & $(0.00)$      \\
Size of partner (Large)    & $0.07^{***}$  & $0.02^{***}$  \\
                           & $(0.01)$      & $(0.00)$      \\
Implementation Year (2027) & $-0.05^{***}$ & $-0.03^{***}$ \\
                           & $(0.01)$      & $(0.00)$      \\
CFE: Poland                & $-0.01$       & $0.00$        \\
                           & $(0.02)$      & $(0.00)$      \\
(Intercept)                & $3.58^{***}$  & $0.30^{***}$  \\
                           & $(0.02)$      & $(0.01)$      \\
\hline
Adj. R Squared             & $0.09$        & $0.10$        \\
N                          & $59980$       & $59980$       \\
\hline
\multicolumn{3}{l}{\scriptsize{\parbox{\linewidth}{$^{***}p<0.001$; $^{**}p<0.01$; $^{*}p<0.05$. Entries are unstandardized coefficients from a linear regression model. Standard errors in parentheses are clustered on respondents. Rating is captured on a seven-point scale. Choice is a dummy and we assume linear probabilities.}}}
\end{tabular}
}
\label{tab:tableG1}
\end{center}
\end{table}
